Nine and ten lonely runners
Abstract
The Lonely Runner Conjecture of Wills and Cusick states that if k+1 runners start running at distinct constant speeds around a unit-length circular track, then for each runner there is a time when he/she is at least 1/(k+1) away from all other runners. Rosenfeld recently obtained a computer-assisted proof of the conjecture for 8 runners. By refining his approach with a sieve, we obtain proofs (also computer-assisted) for 9 and 10 runners.
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